0
To find the area under the standard normal curve between -1.33 and the mean (0), we can use the standard normal distribution table or a calculator. The area to the left of -1.33 is approximately 0.0918. Since the total area under the curve is 1 and the curve is symmetrical around the mean, the area between -1.33 and 0 is about 0.5 - 0.0918 = 0.4082. Thus, the area under the curve from -1.33 to the mean is approximately 0.4082.
What else can I help you with?
What is the area under the standard normal distribution curve between z0.75 and z1.89?
0.1972
What area is to the left of z equals -2.37 under that standard normal curve?
The area is 0.008894
What area under the standard normal curve falls outside the z-value -2.5 and 2.5?
0.0124
The area under the normal curve is greatest in which scenario?
The area under the normal curve is ALWAYS 1.
How do you compute probabilities of a standard normal random variable?
You need to determine the area under the curve between the values in question. This is easy to do because there are tables that give the area values.
What is the area under the standard normal curve?
the standard normal curve 2
He area under the standard normal curve is?
The area under the standard normal curve is 1.
What is the area under the standard normal distribution curve between z1.50 and z2.50?
~0.0606
What is the area under the standard normal distribution curve between z0.75 and z1.89?
0.1972
What is the area under the normal curve between Z0.0 and Z1.79?
What is the area under the normal curve between z=0.0 and z=1.79?
What is the area under standard normal distribution curve between z equals 0 and z equals 2.16?
0.4846
What is the area under standard normal distribution curve between z equals 0 and z equals -2.16?
2.16
What area under the standard normal curve falls between the z value -1.5 and 2.5?
The area is 0.9270, approx.
How is probability related to the area under the normal curve?
The Normal curve is a graph of the probability density function of the standard normal distribution and, as is the case with any continuous random variable (RV), the probability that the RV takes a value in a given range is given by the integral of the function between the two limits. In other words, it is the area under the curve between those two values.
What is the z score of 0.0011 that corresponds to the area under the standard normal curve?
3.06
How does 1 sigma represent 68.8 percent of the total area under a normal curve?
1 sigma does not represent 68.8 percent of anything.The area under the standard normal curve, between -0.5 and +0.5, that i, the central 1 sigma, is equal to 0.68269 or 68.3%.
What is the area under the normal curve between z equals 0.0 and z equals 2.0?
What is the area under the normal curve between z equals 0.0 and z equals 2.0?
